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From nonlinear eigenvalue problems to fast transforms, number theoretic operators, and special quantum states
- Prelegent(ci)
- Artur Sowa
- Afiliacja
- Uniwersytet w Saskatchewan, Kanada
- Termin
- 21 listopada 2013 12:30
- Pokój
- p. 4060
- Seminarium
- Seminarium Zakładu Równań Fizyki Matematycznej
I
will discuss the properties of a special class of Hilbert and Banach space
operators, called D-matrix
operators, that arise naturally in the analysis of differential-algebraic
eigenvalue problems. Onone
hand, these objects furnish a matrix representation of the classical Dirichlet
series and through that
endow a new analytic perspective at some problems of number theory. On the
other hand, D-matrix
operators allow the construction of a large class of novel fast transforms for
signal processing applications.
They also suggest a new point of view at the morphology of nonselfadjoint
operators. Time
permitting, I will briey outline the related concept of E-matrices which
represent specialized quantum
states. I will show how such states can be implemented using a quantum circuit
and, as an upshot,
give a quantum algorithm for evaluation of the Dirichlet product.
