A relationship has two sides.
After graduating in chemistry at Oxford over 40 years ago I could not find a job as a chemist, so I joined the management consultancy training scheme at the accountancy firm Deloitte in London. The firm required me to retrain as a chartered accountant. During a class covering the balancing of accounts on double entry bookkeeping, with my head full of concepts about symmetry in molecules and fundamental particles, I experienced a eureka moment. I realised that double entry bookkeeping and equation-based mathematics are actually one-sided. They are inherently unsuitable for coding and processing quantitative information about the two sides of any relationship, whether it be between two people or humanity and the planet. All systems built on the principle of balance – democratic institutions, finance, the recently introduced technology known as artificial intelligence (AI), and so on will fail, because they do not treat the two sides of a relationship symmetrically.
I quit the job with Deloitte and embarked on a career as a patent attorney, practicing worldwide across a wide field of technologies. It is very likely that you or a family member will have been treated with at least one life-saving medicine protected by a patent that I created. After I retired I returned to my interest in relational symmetry and created the new mathematics of relationships that you will find described in this website.
The new mathematics of relationships needs to resolve a paradox.
A relationship (one object) consists of two sides (two mutually exclusive objects).
The key to resolving this paradox of two mutually exclusive objects being coordinated in one object lies in the bilateral symmetry of the human body. The human body has two mutually exclusive sides – left and right – that are coordinated as one body. What I have invented/discovered is the mechanism that keeps these two sides coordinated. It works on a wholly new principle, which I as the inventor have given the name chiralkine.
Like a patent specification, this website contains a complete description of what the invention is, why it is useful and how to put it into effect. To understand it, you need to let go of all you have been taught from kindergarten onwards about balance and equations and trust the logic! The familiar world of balance is still there, but there is much more that thinking one-sidedly on the principle of balance hides from sight.
Martin A. Hay