Stochastic integral representation theorem for quantum semimartingales

Some self-adjoint quantum semimartingales

Belton, Alexander C. R.

May 2006

It is proved that the quantum stochastic gauge integral preserves self-adjointness of vacuum-adapted...

Quantum probability for probabilists

Meyer, Paul-André

January 1995

In recent years, the classical theory of stochastic integration and stochastic differential equation...

Quasi-free quantum stochastic integrals for the CAR and CCR

Barnett, C
Streater, R.F
Wilde, I.F

June 1983

AbstractA theory of quantum martingales and quantum stochastic integrals in quasi-free representatio...

Stochastic integral representation theorem for quantum semimartingales

Ji, Un Cig

June 2003

AbstractThe quantum stochastic integral of Itô type formulated by Hudson and Parthasarathy is extend...

A representation free quantum stochastic calculus

Accardi, L
Fagnola, F
Quaegebeur, J

February 1992

AbstractWe develop a representation free stochastic calculus based on three inequalities (semimartin...

Quantum Ω-semimartingales and stochastic evolutions

Belton, Alexander C. R.

December 2001

We explore Ω-adaptedness, a variant of the usual notion of adaptedness found in stochastic calculus....

Quantum stochastic calculus with maximal operator domains.

Lindsay, J. Martin
Attal, Stéphane

January 2004

Quantum stochastic calculus is extended in a new formulation in which its stochastic integrals achie...

Quantum Ω-Semimartingales and Stochastic Evolutions

Belton, Alexander C.R

December 2001

AbstractWe explore Ω-adaptedness, a variant of the usual notion of adaptedness found in stochastic c...

On non-Fock boson stochastic integrals

Lindsay, J.M
Wilde, I.F

January 1986

AbstractWe show that certain non-Fock quantum boson stochastic integrals are canonically defined as ...

Integral representation of quantum martingales

Ji, Un Cig
Sinha, Kalyan B.

January 2005

A stochastic integral representation in terms of generalized integral kernel operator is proved for ...

A quantum nonadapted Ito formula and stochastic analysis in Fock scale

Belavkin, V.P

December 1991

AbstractA generalized definition of quantum stochastic (QS) integrals and differentials is given in ...

Quantum stochastic integrals under standing hypotheses

Barnett, C
Streater, R.F
Wilde, I.F

October 1987

AbstractWe study the meaning of stochastic integrals when the integrator is a quantum stochastic pro...

An isomorphism of quantum semimartingale algebras

Belton, Alexander C. R.

June 2004

We give details of a *-linear bijection between adapted (in the sense of Hudson and Parthasarathy) a...

Stochastic integral representations of second quantization operators

Pautrat, Yan

March 2004

AbstractWe give a necessary and sufficient condition for the second quantization operator Γ(h) of a ...

Quantum Stochastic Calculus K.R. PARTHASARATHY

To Alberto Frigerio

October 2016

ABSTRACT. The basic integrator processes of quantum stochastic calcu-lus, namely, creation, conserva...

Some self-adjoint quantum semimartingales

Belton, Alexander C. R.

May 2006

It is proved that the quantum stochastic gauge integral preserves self-adjointness of vacuum-adapted...

Quantum probability for probabilists

Meyer, Paul-André

January 1995

In recent years, the classical theory of stochastic integration and stochastic differential equation...

Quasi-free quantum stochastic integrals for the CAR and CCR

Barnett, C
Streater, R.F
Wilde, I.F

June 1983

AbstractA theory of quantum martingales and quantum stochastic integrals in quasi-free representatio...

Stochastic integral representation theorem for quantum semimartingales

Ji, Un Cig

June 2003

AbstractThe quantum stochastic integral of Itô type formulated by Hudson and Parthasarathy is extend...

A representation free quantum stochastic calculus

Accardi, L
Fagnola, F
Quaegebeur, J

February 1992

AbstractWe develop a representation free stochastic calculus based on three inequalities (semimartin...

Quantum Ω-semimartingales and stochastic evolutions

Belton, Alexander C. R.

December 2001

We explore Ω-adaptedness, a variant of the usual notion of adaptedness found in stochastic calculus....

Quantum stochastic calculus with maximal operator domains.

Lindsay, J. Martin
Attal, Stéphane

January 2004

Quantum stochastic calculus is extended in a new formulation in which its stochastic integrals achie...

Quantum Ω-Semimartingales and Stochastic Evolutions

Belton, Alexander C.R

December 2001

AbstractWe explore Ω-adaptedness, a variant of the usual notion of adaptedness found in stochastic c...

On non-Fock boson stochastic integrals

Lindsay, J.M
Wilde, I.F

January 1986

AbstractWe show that certain non-Fock quantum boson stochastic integrals are canonically defined as ...

Integral representation of quantum martingales

Ji, Un Cig
Sinha, Kalyan B.

January 2005

A stochastic integral representation in terms of generalized integral kernel operator is proved for ...

A quantum nonadapted Ito formula and stochastic analysis in Fock scale

Belavkin, V.P

December 1991

AbstractA generalized definition of quantum stochastic (QS) integrals and differentials is given in ...

Quantum stochastic integrals under standing hypotheses

Barnett, C
Streater, R.F
Wilde, I.F

October 1987

AbstractWe study the meaning of stochastic integrals when the integrator is a quantum stochastic pro...

An isomorphism of quantum semimartingale algebras

Belton, Alexander C. R.

June 2004

We give details of a *-linear bijection between adapted (in the sense of Hudson and Parthasarathy) a...

Stochastic integral representations of second quantization operators

Pautrat, Yan

March 2004

AbstractWe give a necessary and sufficient condition for the second quantization operator Γ(h) of a ...

Quantum Stochastic Calculus K.R. PARTHASARATHY

To Alberto Frigerio

October 2016

ABSTRACT. The basic integrator processes of quantum stochastic calcu-lus, namely, creation, conserva...

Some self-adjoint quantum semimartingales

Belton, Alexander C. R.

May 2006

It is proved that the quantum stochastic gauge integral preserves self-adjointness of vacuum-adapted...

Quantum probability for probabilists

Meyer, Paul-André

January 1995

In recent years, the classical theory of stochastic integration and stochastic differential equation...

Quasi-free quantum stochastic integrals for the CAR and CCR

Barnett, C
Streater, R.F
Wilde, I.F

June 1983

AbstractA theory of quantum martingales and quantum stochastic integrals in quasi-free representatio...

Stochastic integral representation theorem for quantum semimartingales

Abstract

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Stochastic integral representation theorem for quantum semimartingales

Abstract

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