Bibliography
Carey R.W. and Pincus J.D.,On the cocycle property for Lefshetz numbers and local index theory, “Operator Theory: Advances and Applications”, Birkhauser Verlag, Basel, 1988, pp. 45–86.
Carey R.W. and Pincus J.D.,Principal Currents, Integral Equations and Operator Theory,2 (1985), 614–640.
Conway J.B.,Towards a functional calculus for subnormal tuples: The minimal normal extension and approximation in several complex variables, to appear Proc. AMS Summer Institute, New Hampshire (1988).
Curto R.E.,Applications of several complex variables to multiparameter spectral theory, “Surveys of Some recent Results in Operator Theory”, Volume 2 (edited by J.B. Conway and B.B. Morrel), Longman Sci. Tech, N.Y., 1988, pp. 24–90.
Pincus, J.D.,The concept of Local Index, (to appear) Proc. AMS Summer Institute, New Hampshire (1988).
Pincus J.D. and Xia Jingbo,Self adjoint and symmetric operators on multiply connected plane domains Journal of Functional Analysis59 (1984), 397–444.
Taylor, J.L.,A joint spectrum for several commuting operators Journal of Functional Analysis6 (1970), 172–191.
Taylor, J.L.,The analytic functional calculus for several commuting operators, Acta Mathematica125 (1970), 1–38.
Xia D.,The analytic model of a subnormal operator, Integral Equations and Operator Theory10 (1987), 255–289.
Xia, D.,Analytic Theory of subnormal operators, Integral Equations and Operator Theory10 (1987), 255–289.
Xia D.,Analytic theory of subnormal n-tuples of operators, to appear Proc AMS Summer Institute, New Hampshire (1988).
Xia D.,On some classes of hyponormal tuples of commuting operators, (to appear) Integral Equations and Operator Theory (special issue dedicated to the memory of Professor Ernst Hellinger).
Author information
Authors and Affiliations
Additional information
The authors gratefully acknowledge the support of the National Science Foundation
Rights and permissions
About this article
Cite this article
Pincus, J.D., Xia, D. A trace formula for subnormal operator tuples. Integr equ oper theory 14, 390–398 (1991). https://doi.org/10.1007/BF01218504
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF01218504