The GSI oscillation mystery Alexander Merle Max-Planck-Institute for Nuclear Physics Heidelberg, Germany Based on: AM: Why a splitting in the final state.

Slides:

Advertisements

Similar presentations

Quantum Computation and Quantum Information – Lecture 2

Advertisements

Quantum One: Lecture 6. The Initial Value Problem for Free Particles, and the Emergence of Fourier Transforms.

The idea of the correlation femtoscopy is based on an impossibility to distinguish between registered particles emitted from different points because.

FSI Phases using CP Asymmetries from B Meson Decay Based on the work arXiv:1402:2978 Jihn E. Kim, Doh Young Mo, Soonkeon Nam Busan Particle Physics Workshop.

What really happens upon quantum measurement?[n eeds revision] References are more fully listed in my Phys Rev A paperPhys Rev A paper Art Hobson Prof.

Neutrino Flavor ratio on Earth and at Astrophysical sources K.-C. Lai, G.-L. Lin, and T. C. Liu, National Chiao Tung university Taiwan INTERNATIONAL SCHOOL.

Quantum One: Lecture 3. Implications of Schrödinger's Wave Mechanics for Conservative Systems.

Emergence of Quantum Mechanics from Classical Statistics.

The GSI anomaly: Theoretical interpretations Alexander Merle Max-Planck-Institute for Nuclear Physics Heidelberg Germany LAUNCH workshop, 9-12 November.

The GSI anomaly Alexander Merle Max-Planck-Institute for Nuclear Physics Heidelberg Based on: H. Kienert, J. Kopp, M. Lindner, AM The GSI anomaly

GSI Effect Aspen Center for Physics June 19, 2009 Stuart Freedman University of California, Berkeley Lawrence Berkeley National Laboratory Stuart Freedman.

1. Experimental setup 2. Many-ion decay spectroscopy 3. Single-ion decay spectroscopy 4. Discussion 5. Summary and outlook Recent results on the two-body.

Degree of polarization of  produced in quasielastic charge current neutrino-nucleus scattering Krzysztof M. Graczyk Jaroslaw Nowak Institute of Theoretical.

No friction. No air resistance. Perfect Spring Two normal modes. Coupled Pendulums Weak spring Time Dependent Two State Problem Copyright – Michael D.

Lesson 8 Beta Decay. Beta -decay Beta decay is a term used to describe three types of decay in which a nuclear neutron (proton) changes into a nuclear.

November INT-JLab Workshop Amplitude analysis for three- hadron states: Historical perspective Ian Aitchison INT-JLab Workshop, UW Nov

Almost all detection of visible light is by the “photoelectric effect” (broadly defined.) There is always a threshold photon energy for detection, even.

4. The Postulates of Quantum Mechanics 4A. Revisiting Representations

New Approach to Quantum Calculation of Spectral Coefficients Marek Perkowski Department of Electrical Engineering, 2005.

Quantum Computation and Quantum Information – Lecture 2 Part 1 of CS406 – Research Directions in Computing Dr. Rajagopal Nagarajan Assistant: Nick Papanikolaou.

Quantum One: Lecture 7. The General Formalism of Quantum Mechanics.

PHYS 3313 – Section 001 Lecture #17

Lecture 5: Electron Scattering, continued... 18/9/2003 1

Generalized Deutsch Algorithms IPQI 5 Jan Background Basic aim : Efficient determination of properties of functions. Efficiency: No complete evaluation.

1 TCP06 Parksville 8/5/06 Electron capture branching ratios for the nuclear matrix elements in double-beta decay using TITAN ◆ Nuclear matrix elements.

Model building: “The simplest neutrino mass matrix” see Harrison and Scott: Phys. Lett. B594, 324 (2004), hep-ph/ , Phys. Lett. B557, 76 (2003).

The Elementary Particles. e−e− e−e− γγ u u γ d d The Basic Interactions of Particles g u, d W+W+ u d Z0Z0 ν ν Z0Z0 e−e− e−e− Z0Z0 e−e− νeνe W+W+ Electromagnetic.

Matter Unit Learning Goal #2: Summarize the major experimental evidence that led to the development of various models, both historic and current.

Non-Exponential Two-Body Beta Decay of Stored Hydrogen-Like Ions Yuri A. Litvinov Joint HEPD - TPD seminar PNPI, Gatchina, Russia September 24, 2009 Max-Planck-Institut.

Interference in BEC Interference of 2 BEC’s - experiments Do Bose-Einstein condensates have a macroscopic phase? How can it be measured? Castin & Dalibard.

Self-similar solutions for A-dependences in relativistic nuclear collisions in the transition energy region. A.A.Baldin.

Physics 222 UCSD/225b UCSB Lecture 5 Mixing & CP Violation (1 of 3) Today we focus on Matter Antimatter Mixing in weakly decaying neutral Meson systems.

Physics 430: Lecture 25 Coupled Oscillations

Quantum Physics II.

Neutrino oscillation physics Alberto Gago PUCP CTEQ-FERMILAB School 2012 Lima, Perú - PUCP.

Engineering the Dynamics Engineering Entanglement and Correlation Dynamics in Spin Chains Correlation Dynamics in Spin Chains [1] T. S. Cubitt 1,2 and.

DISCRETE08 Valencia P.Kienle Time-Modulation of Orbital Electron Capture Decays by Mixing of Massive Neutrinos P. Kienle, Stefan Meyer Institut.

Physics 2170 – Spring Some interesting aspects of quantum mechanics The last homework is due at 12:50pm.

Quantum Mechanical Cross Sections In a practical scattering experiment the observables we have on hand are momenta, spins, masses, etc.. We do not directly.

1 On extraction of the total photoabsorption cross section on the neutron from data on the deuteron  Motivation: GRAAL experiment (proton, deuteron) 

Pinning of Fermionic Occupation Numbers Christian Schilling ETH Zürich in collaboration with M.Christandl, D.Ebler, D.Gross Phys. Rev. Lett. 110,

Time-Modulation of Entangled Two-Body Weak Decays with Massive Neutrinos P. Kienle Excellence Cluster “ Universe ” Technische Universit ä t M ü nchen “In.

Lecture 174/11/ Analysis: (solutions will be posted on the web site under “homework”) basic recipe: about 40% of the marks for knowing the.

Brian Plimley Physics 129 November Outline  What is the anomalous magnetic moment?  Why does it matter?  Measurements of a µ  : CERN.

1 Methods of Experimental Particle Physics Alexei Safonov Lecture #2.

10th Inter. Natl. Spring Seminar on Nuclear Physics P. Kienle Time-Modulation of Two-Body Weak Decays with Massive Neutrinos P. Kienle Excellence Cluster.

Itay Hen Dec 12, 2015 NIPS Quantum Machine Learning Workshop Itay Hen Information Sciences Institute, USC NIPS Quantum Machine Learning Workshop December.

Neutrino Oscillation in Dense Matter Speaker: Law Zhiyang, National University of Singapore.

Non-Linear Effects in Strong EM Field Alexander Titov Bogoliubov Lab. of Theoretical Physics, JINR, Dubna International.

Chapter 3 Postulates of Quantum Mechanics. Questions QM answers 1) How is the state of a system described mathematically? (In CM – via generalized coordinates.

KT McDonald NuFact’13 (IHEP) August 21, Two Questions from an Inquiring “Student:” Do Neutrino Oscillations Conserve Energy? Could Decoherence Blur.

Time Dependent Two State Problem

Open quantum systems.

Examples of Measured Time-Frequency Traces

Neutrino oscillations with the T2K experiment

4. The Postulates of Quantum Mechanics 4A. Revisiting Representations

Supersymmetric Quantum Mechanics

Heisenberg Uncertainty

Exam 2 free response retake: Today, 5 pm room next to my office

Neutrino oscillation physics

Concept test 14.1 Is the function graph d below a possible wavefunction for an electron in a 1-D infinite square well between

Particle oscillations in COLLAPSE models

Presentation transcript:

The GSI oscillation mystery Alexander Merle Max-Planck-Institute for Nuclear Physics Heidelberg, Germany Based on: AM: Why a splitting in the final state cannot explain the GSI-Oscillations, arXiv: H. Kienert, J. Kopp, M. Lindner, AM: The GSI anomaly, J. Phys. Conf. Ser. 136, , 2008, arXiv: Erice, 18th September 2009

Contents: 1.The starting point: What has been observed at GSI 2.Basic thoughts: The superposition principle 3.The easiest formulation: Probability Amplitudes 4.Finally: Conclusions

1. The starting point: What has been observed at GSI

Litvinov et al: Phys. Lett. B664, 162 (2008)

1. The starting point: What has been observed at GSI Periodic modulation of the expect- ed exponential law in EC-decays of different highly charged ions (Pm-142 & Pr- 140) Litvinov et al: Phys. Lett. B664, 162 (2008)

1. The starting point: What has been observed at GSI Periodic modulation of the expect- ed exponential law in EC-decays of different highly charged ions (Pm-142 & Pr- 140) exponential law Litvinov et al: Phys. Lett. B664, 162 (2008)

1. The starting point: What has been observed at GSI Periodic modulation of the expect- ed exponential law in EC-decays of different highly charged ions (Pm-142 & Pr- 140) exponential law periodic modulation Litvinov et al: Phys. Lett. B664, 162 (2008)

1. The starting point: What has been observed at GSI Periodic modulation of the expect- ed exponential law in EC-decays of different highly charged ions (Pm-142 & Pr- 140) exponential law periodic modulation Litvinov et al: Phys. Lett. B664, 162 (2008) T~7s

1. The starting point: What has been observed at GSI Periodic modulation of the expect- ed exponential law in EC-decays of different highly charged ions (Pm-142 & Pr- 140) Litvinov et al: Phys. Lett. B664, 162 (2008)

1. The starting point: What has been observed at GSI Literature on the GSI Anomaly (complete?): Lipkin, arXiv: ; Litvinov et al., Phys. Lett. B664 (2008) 162–168, arXiv: ; Ivanov et al., arXiv: ; Giunti, arXiv: ; Ivanov et al., arXiv: ; Faber, arXiv: ; Walker, Nature 453N7197 (2008) 864–865; Ivanov et al., arXiv: ; Kleinert & Kienle, arXiv: ; Ivanov et al., Phys. Rev. Lett. 101 (2008) ; Burkhardt et al., arXiv: ; Peshkin, arXiv: ; Giunti, Phys. Lett. B665 (2008) 92– 94, arXiv: ; Lipkin, arXiv: ; Vetter et al., Phys. Lett. B670 (2008) 196–199, arXiv: ; Litvinov et al., arXiv: ; Ivanov et al., arXiv: ; Faestermann et al., arXiv: ; Giunti, arXiv: ; Kienert et al., J. Phys. Conf. Ser. 136 (2008) , arXiv: ; Gal, arXiv: ; Pavlichenkov, Europhys. Lett. 85 (2009) 40008, arXiv: ; Cohen et al., arXiv: ; Peshkin, arXiv: ; Lambiase et al., arXiv: ; Giunti, Nucl. Phys. Proc. Suppl. 188 (2009) 43–45, arXiv: ; Lipkin, arXiv: ; Ivanov et al., arXiv: ; Giunti, arXiv: ; Faber et al., arXiv: ; Isakov, arXiv: ; Winckler et al., arXiv: ; Merle, arXiv: ; Ivanov & Kienle, Phys. Rev. Lett. 103 (2009) , arXiv: ; Flambaum, arXiv: ; Kienle & Ivanov, arXiv: ; Kienle & Ivanov, arXiv:

2. Basic thoughts: The superposition principle

Feynman diagrams:

2. Basic thoughts: The superposition principle Feynman diagrams:Neutrino oscillations

2. Basic thoughts: The superposition principle Feynman diagrams:Neutrino oscillations coherent summation

2. Basic thoughts: The superposition principle Feynman diagrams:Electron capture

2. Basic thoughts: The superposition principle Feynman diagrams:Electron capture incoherent summation

2. Basic thoughts: The superposition principle The superposition principle:

2. Basic thoughts: The superposition principle The superposition principle: 1.If different ways lead to the same final state in one particular process, then one has to add the respective partial amplitudes to obtain the total amplitude. The probability of the process to happen is then proportional to the absolute square of this total amplitude (coherent summation). 2.If a reaction leads to physically distinct final states, then one has to add the probabilities for the different processes (incoherent summation).

2. Basic thoughts: The superposition principle The superposition principle: 1.If different ways lead to the same final state in one particular process, then one has to add the respective partial amplitudes to obtain the total amplitude. The probability of the process to happen is then proportional to the absolute square of this total amplitude (coherent summation). 2.If a reaction leads to physically distinct final states, then one has to add the probabilities for the different processes (incoherent summation). Process: e.g. e + e - → μ + μ - Way: e.g. e + e - → μ + μ - by Z-exchange, but NOT γ or H

2. Basic thoughts: The superposition principle The superposition principle: BUT: Why is the superposition principle true? Can it somehow be derived? Is there an easier (more intuitive) language?

2. Basic thoughts: The superposition principle The superposition principle: BUT: Why is the superposition principle true? Can it somehow be derived? Is there an easier (more intuitive) language? YES!!! → We can use probability amplitudes.

3. The easiest formulation: Probability Amplitudes

First example: Charged pion decay

3. The easiest formulation: Probability Amplitudes First example: Charged pion decay Actually 2 processes: π + →μ + ν μ or π + → e + ν e both decay modes are possible

3. The easiest formulation: Probability Amplitudes First example: Charged pion decay Actually 2 processes: π + →μ + ν μ or π + → e + ν e both decay modes are possible Initial state: 100% charged pion π + → corresponding total amplitude for this state at t=0:

3. The easiest formulation: Probability Amplitudes First example: Charged pion decay Actually 2 processes: π + →μ + ν μ or π + → e + ν e both decay modes are possible Initial state: 100% charged pion π + → corresponding total amplitude for this state at t=0: After some time t>0:

3. The easiest formulation: Probability Amplitudes

Important points:

3. The easiest formulation: Probability Amplitudes Important points: normalization:

3. The easiest formulation: Probability Amplitudes Important points: normalization: boundary conditions:

3. The easiest formulation: Probability Amplitudes Important points: normalization: orthogonality: the basis states are clearly distinct → they form an orthogonal basis set for all possible states boundary conditions:

3. The easiest formulation: Probability Amplitudes The process of the measurement:

3. The easiest formulation: Probability Amplitudes The process of the measurement: Every detector does nothing else than projecting the time evolved state onto some state

3. The easiest formulation: Probability Amplitudes The process of the measurement: Every detector does nothing else than projecting the time evolved state onto some state → corresponding probability to measure that state:

3. The easiest formulation: Probability Amplitudes The process of the measurement: Every detector does nothing else than projecting the time evolved state onto some state → corresponding probability to measure that state: → the only question is how looks!

3. The easiest formulation: Probability Amplitudes The process of the measurement: Every detector does nothing else than projecting the time evolved state onto some state → corresponding probability to measure that state: → the only question is how looks! → different cases…

3. The easiest formulation: Probability Amplitudes Trivial case: no measurement at all

3. The easiest formulation: Probability Amplitudes Trivial case: no measurement at all no detection → one has gained no information

3. The easiest formulation: Probability Amplitudes Trivial case: no measurement at all no detection → one has gained no information → the projected state is just the time-evolved state itself:

3. The easiest formulation: Probability Amplitudes Trivial case: no measurement at all no detection → one has gained no information → the projected state is just the time-evolved state itself: Of course, the probability for anything to happen is 100%.

3. The easiest formulation: Probability Amplitudes Next step: the detector can only give us the information that the pion has decayed, but we do not know the exact final state

3. The easiest formulation: Probability Amplitudes Next step: the detector can only give us the information that the pion has decayed, but we do not know the exact final state NOTE: This means that the detector cannot distinguish the two states and !!!!

3. The easiest formulation: Probability Amplitudes Next step: the detector can only give us the information that the pion has decayed, but we do not know the exact final state NOTE: This means that the detector cannot distinguish the two states and !!!! We have only gained the information that the initial state is not present anymore:

3. The easiest formulation: Probability Amplitudes Next step: the detector can only give us the information that the pion has decayed, but we do not know the exact final state NOTE: This means that the detector cannot distinguish the two states and !!!! We have only gained the information that the initial state is not present anymore: → projected state (correctly normalized):

3. The easiest formulation: Probability Amplitudes The corresponding probability is:

3. The easiest formulation: Probability Amplitudes The corresponding probability is: → any phase in will drop out due to the absolute value!

3. The easiest formulation: Probability Amplitudes The corresponding probability is: → any phase in will drop out due to the absolute value! → incoherent summation!!!

3. The easiest formulation: Probability Amplitudes One more case: we detect the pion

3. The easiest formulation: Probability Amplitudes One more case: we detect the pion information gained:

3. The easiest formulation: Probability Amplitudes One more case: we detect the pion information gained: projected state:

3. The easiest formulation: Probability Amplitudes One more case: we detect the pion information gained: projected state: corresponding probability:

3. The easiest formulation: Probability Amplitudes One more case: we detect the pion information gained: projected state: corresponding probability: → no oscillation

3. The easiest formulation: Probability Amplitudes Yet another one: we the particular final state

3. The easiest formulation: Probability Amplitudes information gained: Yet another one: we the particular final state

3. The easiest formulation: Probability Amplitudes information gained: Yet another one: we the particular final state probability:

3. The easiest formulation: Probability Amplitudes information gained: → again no oscillation Yet another one: we the particular final state probability:

3. The easiest formulation: Probability Amplitudes information gained: → again no oscillation Yet another one: we the particular final state probability: Question: When do we get oscillations at all??

3. The easiest formulation: Probability Amplitudes information gained: → again no oscillation Yet another one: we the particular final state probability: Question: When do we get oscillations at all?? Answer: If the detector does more than only killing some partial amplitudes.

3. The easiest formulation: Probability Amplitudes Hypothetical example: measurement of a new quantum number, under which neither e + nor μ + is an eigenstate, but some superposition of them

3. The easiest formulation: Probability Amplitudes possible measured state (example): Hypothetical example: measurement of a new quantum number, under which neither e + nor μ + is an eigenstate, but some superposition of them

3. The easiest formulation: Probability Amplitudes possible measured state (example): Hypothetical example: measurement of a new quantum number, under which neither e + nor μ + is an eigenstate, but some superposition of them corresponding probability:

3. The easiest formulation: Probability Amplitudes possible measured state (example): this term can oscillate! Hypothetical example: measurement of a new quantum number, under which neither e + nor μ + is an eigenstate, but some superposition of them corresponding probability:

3. The easiest formulation: Probability Amplitudes Second example: Neutrinos

3. The easiest formulation: Probability Amplitudes Consideration: neutrino that is produced (together with a daughter ion D) in an electron capture decay of the mother ion M Second example: Neutrinos

3. The easiest formulation: Probability Amplitudes Consideration: neutrino that is produced (together with a daughter ion D) in an electron capture decay of the mother ion M Second example: Neutrinos time-evolved amplitude (U ei factored out):

3. The easiest formulation: Probability Amplitudes Consideration: neutrino that is produced (together with a daughter ion D) in an electron capture decay of the mother ion M Second example: Neutrinos time-evolved amplitude (U ei factored out): with:

3. The easiest formulation: Probability Amplitudes Again as start: the mother is seen

3. The easiest formulation: Probability Amplitudes Again as start: the mother is seen information:

3. The easiest formulation: Probability Amplitudes Again as start: the mother is seen projection: information:

3. The easiest formulation: Probability Amplitudes → NO oscillation… Again as start: the mother is seen projection: information:

3. The easiest formulation: Probability Amplitudes The GSI-case: we detect the daughter ion, but cannot distinguish the states and

3. The easiest formulation: Probability Amplitudes only information: the mother is not there anymore The GSI-case: we detect the daughter ion, but cannot distinguish the states and

3. The easiest formulation: Probability Amplitudes normalized state: only information: the mother is not there anymore The GSI-case: we detect the daughter ion, but cannot distinguish the states and

3. The easiest formulation: Probability Amplitudes projection:

3. The easiest formulation: Probability Amplitudes projection: → NO OSCILLATION!!!

3. The easiest formulation: Probability Amplitudes projection: → NO OSCILLATION!!! BUT: Why do some authors obtain oscillations?

3. The easiest formulation: Probability Amplitudes The reason is the following: Instead of correctly projecting on the evolved state they project, e.g., onto an electron neutrino state which is different from the time-evolved one (it is simply not the same state as the one which they claim to be present):

3. The easiest formulation: Probability Amplitudes The reason is the following: Instead of correctly projecting on the evolved state they project, e.g., onto an electron neutrino state which is different from the time-evolved one (it is simply not the same state as the one which they claim to be present): → What does this change?

3. The easiest formulation: Probability Amplitudes corresponding projection:

3. The easiest formulation: Probability Amplitudes corresponding projection: → The last term does oscillate!

3. The easiest formulation: Probability Amplitudes corresponding projection: → The last term does oscillate! BUT: One has not used the complete information that has been obtained in the experiment! The time that has passed since the production of the mother ion has been neglected!

3. The easiest formulation: Probability Amplitudes corresponding projection: → The last term does oscillate! BUT: One has not used the complete information that has been obtained in the experiment! The time that has passed since the production of the mother ion has been neglected! → This treatment is not complete!

3. The easiest formulation: Probability Amplitudes The remaining question: Does the neutrino that is emitted in the GSI-experiment oscillate?

3. The easiest formulation: Probability Amplitudes The remaining question: Does the neutrino that is emitted in the GSI-experiment oscillate? The obvious answer: Of course!

3. The easiest formulation: Probability Amplitudes The remaining question: Does the neutrino that is emitted in the GSI-experiment oscillate? The obvious answer: Of course! BUT: This can also be shown explicitely!

3. The easiest formulation: Probability Amplitudes The remaining question: Does the neutrino that is emitted in the GSI-experiment oscillate? The obvious answer: Of course! BUT: This can also be shown explicitely! State after detection of the mother: (for simplicity ; does not change anything here)

3. The easiest formulation: Probability Amplitudes Re-phasing this state and measuring the time from t on → new initial state:

3. The easiest formulation: Probability Amplitudes Re-phasing this state and measuring the time from t on → new initial state: Time-evolution:

3. The easiest formulation: Probability Amplitudes Re-phasing this state and measuring the time from t on → new initial state: Time-evolution: with:

3. The easiest formulation: Probability Amplitudes Further complication: Entanglement of the neutrino and the daughter ion.

3. The easiest formulation: Probability Amplitudes Further complication: Entanglement of the neutrino and the daughter ion. the daughter ion is localized → has to be described by a wave packet the daughter ion is detected, but not with sufficient kinematical precision to distinguish the different neutrino mass eigenstates → the same like a non-measurement!

3. The easiest formulation: Probability Amplitudes Further complication: Entanglement of the neutrino and the daughter ion. the daughter ion is localized → has to be described by a wave packet the daughter ion is detected, but not with sufficient kinematical precision to distinguish the different neutrino mass eigenstates → the same like a non-measurement!

3. The easiest formulation: Probability Amplitudes Further complication: Entanglement of the neutrino and the daughter ion. the daughter ion is localized → has to be described by a wave packet the daughter ion is detected, but not with sufficient kinematical precision to distinguish the different neutrino mass eigenstates → the same like a non-measurement! → This is done most easily in the density matrix formalism!

3. The easiest formulation: Probability Amplitudes Density matrix of the time-evolved state: with:

3. The easiest formulation: Probability Amplitudes Density matrix of the time-evolved state: with: Ion not measured → trace over the corresponding states:

3. The easiest formulation: Probability Amplitudes This can, e.g., be projected onto a μ-neutrino:

3. The easiest formulation: Probability Amplitudes This can, e.g., be projected onto a μ-neutrino: Corresponding projection operator:

3. The easiest formulation: Probability Amplitudes This can, e.g., be projected onto a μ-neutrino: Corresponding projection operator: Probability to detect the ν μ :

3. The easiest formulation: Probability Amplitudes This can, e.g., be projected onto a μ-neutrino: Corresponding projection operator: Probability to detect the ν μ : Explicit:

3. The easiest formulation: Probability Amplitudes This can, e.g., be projected onto a μ-neutrino: Corresponding projection operator: Probability to detect the ν μ : Explicit: … oscillates!!!

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

4. Finally: Conclusions the modification of the exponential decay not in the GSI-experiment cannot be explained by neutrino oscillations this can be seen most easily in the formulation with probability amplitudes unfortunately, a satisfying explanation is still missing… … if you have any idea: Phone: +49/6221/

THANK YOU!!!!