Howard, Ralph, 1950-
The kinematic formula in Riemannian homogeneous spaces / [electronic resource] Ralph Howard. - Providence, R.I. : American Mathematical Society, c1993. - 1 online resource (vi, 69 p.) - Memoirs of the American Mathematical Society, v. 509 0065-9266 (print); 1947-6221 (online); .
Includes bibliographical references.
1. Introduction 2. The basic integral formula for submanifolds of a Lie group 3. Poincar�e's formula in homogeneous spaces 4. Integral invariants of submanifolds of homogeneous spaces, the kinematic formula, and the transfer principle 5. The second fundamental form of an intersection 6. Lemmas and definitions 7. Proof of the kinematic formula and the transfer principle 8. Spaces of constant curvature 9. An algebraic characterization of the polynomials in the Weyl tube formula 10. The Weyl tube formula and the Chern-Federer kinematic formula
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470400866 (online)
Integral geometry.
Riemannian manifolds.
QA3 QA649 / .A57 no. 509
510 s 516.3/73
The kinematic formula in Riemannian homogeneous spaces / [electronic resource] Ralph Howard. - Providence, R.I. : American Mathematical Society, c1993. - 1 online resource (vi, 69 p.) - Memoirs of the American Mathematical Society, v. 509 0065-9266 (print); 1947-6221 (online); .
Includes bibliographical references.
1. Introduction 2. The basic integral formula for submanifolds of a Lie group 3. Poincar�e's formula in homogeneous spaces 4. Integral invariants of submanifolds of homogeneous spaces, the kinematic formula, and the transfer principle 5. The second fundamental form of an intersection 6. Lemmas and definitions 7. Proof of the kinematic formula and the transfer principle 8. Spaces of constant curvature 9. An algebraic characterization of the polynomials in the Weyl tube formula 10. The Weyl tube formula and the Chern-Federer kinematic formula
Access is restricted to licensed institutions
Electronic reproduction.
Providence, Rhode Island :
American Mathematical Society.
2012
Mode of access : World Wide Web
9781470400866 (online)
Integral geometry.
Riemannian manifolds.
QA3 QA649 / .A57 no. 509
510 s 516.3/73