Add to ORKGA historical review and philosophical look at the introduction of “negative probability” as well as “complex probability” is suggested. The generalization of “probability” is forced by mathematical models in physical or technical disciplines. Initially, they are involved only as an auxiliary tool to complement mathematical models to the completeness to corresponding operations. Rewards, they acquire ontological status, especially in quantum mechanics and its formulation as a natural information theory as “quantum information” after the experimental confirmation the phenomena of “entanglement”. Philosophical interpretations appear. A generalization of them is suggested: ontologically, they correspond to a relevant generalization to the relat...
In this paper, we examined the connection between quantum systems’ indistinguishability and signed (...
Many results of modern physics--those of quantum mechanics, for instance--come in a probabilistic gu...
The concept of Logical Entropy, $ {S}_{\mathrm{L}}=1-{\sum }_{i=1}^n {p}_i^2$, where the pi are norm...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
This paper offers some reflections on the concepts of objective and subjective probability and Lewis...
It is necessary to distinguish the logic of certainty from the logic of probable. By fusing together...
The concept of Logical Entropy, $ {S}_{\mathrm{L}}=1-{\sum }_{i=1}^n {p}_i^2$, where the pi are norm...
In this paper, we examined the connection between quantum systems’ indistinguishability and signed (...
Many results of modern physics--those of quantum mechanics, for instance--come in a probabilistic gu...
The concept of Logical Entropy, $ {S}_{\mathrm{L}}=1-{\sum }_{i=1}^n {p}_i^2$, where the pi are norm...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
A historical review and philosophical look at the introduction of “negative probability” as well as ...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
“Negative probability” in practice. Quantum Communication: Very small phase space regions turn out t...
This paper offers some reflections on the concepts of objective and subjective probability and Lewis...
It is necessary to distinguish the logic of certainty from the logic of probable. By fusing together...
The concept of Logical Entropy, $ {S}_{\mathrm{L}}=1-{\sum }_{i=1}^n {p}_i^2$, where the pi are norm...
In this paper, we examined the connection between quantum systems’ indistinguishability and signed (...
Many results of modern physics--those of quantum mechanics, for instance--come in a probabilistic gu...
The concept of Logical Entropy, $ {S}_{\mathrm{L}}=1-{\sum }_{i=1}^n {p}_i^2$, where the pi are norm...