Sold Out
Book Categories |
Preface to the Classics edition; Preface; Corrections and comments; 1. Random fields and excursion sets; 2. Homogeneous fields and their spectra; 3. Sample function regularity; 4. Geometry and excursion characteristics; 5. Some expectations; 6. Local maxima and high-level excursions; 7. Some non-Gaussian fields; 8. Sample function erraticism and Hausdorff dimension; Appendix. The Markov property for Gaussian fields; References; Author index; Subject index.
Login|Complaints|Blog|Games|Digital Media|Souls|Obituary|Contact Us|FAQ
CAN'T FIND WHAT YOU'RE LOOKING FOR? CLICK HERE!!! X
You must be logged in to add to WishlistX
This item is in your Wish ListX
This item is in your CollectionThe Geometry of Random Fields (In Applied Mathematics)
X
This Item is in Your InventoryThe Geometry of Random Fields (In Applied Mathematics)
X
You must be logged in to review the productsX
X
X
Add The Geometry of Random Fields (In Applied Mathematics), Originally published in 1981, The Geometry of Random Fields remains an important text for its coverage and exposition of the theory of both smooth and non-smooth random fields; closed form expressions for various geometric characteristics of the excursion, The Geometry of Random Fields (In Applied Mathematics) to the inventory that you are selling on WonderClubX
X
Add The Geometry of Random Fields (In Applied Mathematics), Originally published in 1981, The Geometry of Random Fields remains an important text for its coverage and exposition of the theory of both smooth and non-smooth random fields; closed form expressions for various geometric characteristics of the excursion, The Geometry of Random Fields (In Applied Mathematics) to your collection on WonderClub |