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[751] Algebraicity of holomorphic mappings between real algebraic sets in$C$^{$n$}

M. S. Baouendi Department of Mathematics, 0112, University of California, San Diego P. Ebenfelt Department of Mathematics, Royal Institute of Technology L. P. Rothschild Department of Mathematics, 0112, University of California, San Diego

TBD mathscidoc:1701.331830

Acta Mathematica, 177, (2), 225-273, 1996.2

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[752] A Littlewood-Richardson rule for the$K$-theory of Grassmannians

Anders Skovsted Buch Department of Mathematical Sciences, University of Aarhus

TBD mathscidoc:1701.331917

Acta Mathematica, 189, (1), 37-78, 2000.11

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[753] A unique continuation theorem for second order parabolic differential operators

C. D. Sogge UCLA, 405 Hilgard Av, Los Angeles, California, USA

TBD mathscidoc:1701.332724

Arkiv for Matematik, 28, (1), 159-182, 1989.1

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[754] The λ($φ$^{4})_{2}quantum field theory without cutoffsquantum field theory without cutoffs

James Glimm Courant Institute of Mathematical Sciences, New York University Arthur Jaffe Courant Institute of Mathematical Sciences, New York University

TBD mathscidoc:1701.331391

Acta Mathematica, 125, (1), 203-267, 1969.11

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[755] Algebraic surfaces with$k$^{*}-action

P. Orlik University of Wisconsin, Madison, Wisconsin, USA P. Wagreich University of Illinois, Chicago, Illinois, USA

TBD mathscidoc:1701.331507

Acta Mathematica, 138, (1), 43-81, 1975.12

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TBD

[751] Algebraicity of holomorphic mappings between real algebraic sets in$C$^{$n$}

M. S. Baouendi Department of Mathematics, 0112, University of California, San Diego P. Ebenfelt Department of Mathematics, Royal Institute of Technology L. P. Rothschild Department of Mathematics, 0112, University of California, San Diego

TBD mathscidoc:1701.331830

[752] A Littlewood-Richardson rule for the$K$-theory of Grassmannians

Anders Skovsted Buch Department of Mathematical Sciences, University of Aarhus

TBD mathscidoc:1701.331917

[753] A unique continuation theorem for second order parabolic differential operators

C. D. Sogge UCLA, 405 Hilgard Av, Los Angeles, California, USA

TBD mathscidoc:1701.332724

[754] The λ($φ$^{4})_{2}quantum field theory without cutoffsquantum field theory without cutoffs

James Glimm Courant Institute of Mathematical Sciences, New York University Arthur Jaffe Courant Institute of Mathematical Sciences, New York University

TBD mathscidoc:1701.331391

[755] Algebraic surfaces with$k$^{*}-action

P. Orlik University of Wisconsin, Madison, Wisconsin, USA P. Wagreich University of Illinois, Chicago, Illinois, USA

TBD mathscidoc:1701.331507

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